Add to ORKGThe quadratic Mandelbrot set has been referred to as the most complex and beautiful object in mathematics and the Riemann Zeta function takes the prize for the most complicated and enigmatic function. Here we elucidate the spectrum of Mandelbrot and Julia sets of Zeta, to unearth the geography of its chaotic and fractal diversities, combining these two extremes int
In this article I will briefly (but maybe even better) what I learned about Rieman's zeta(s) functio...
Visualization of sets in Euclidean space that possess notions of non-integer dimension has lead to a...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
Abstract: The quadratic Mandelbrot set has been referred to as the most complex and beautiful object...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
What is it? It is what it is... just kidding. First, the Riemann zeta function. It has many forms, i...
Offers a study of the vibrations of fractal strings, that is, one-dimensional drums with fractal bou...
Over the years fractal geometry has established itself as a substantial mathematical theory in its o...
International audienceIn this paper, we generalize the zeta function for a fractal string (as in [18...
Recently, there has been a great interest in understanding the mathematics behind fractal sets such ...
Fractal geometry is usually studied in the context of bounded sets. In this setting,\ud various prop...
Space-filling curves have been colloquially referred to as "fractals" since the term was coined and ...
Soon after B. Mandelbrot’s discovery of the set bearing his name (1), fractal geometry as tool in th...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
In this article I will briefly (but maybe even better) what I learned about Rieman's zeta(s) functio...
Visualization of sets in Euclidean space that possess notions of non-integer dimension has lead to a...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
Abstract: The quadratic Mandelbrot set has been referred to as the most complex and beautiful object...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
What is it? It is what it is... just kidding. First, the Riemann zeta function. It has many forms, i...
Offers a study of the vibrations of fractal strings, that is, one-dimensional drums with fractal bou...
Over the years fractal geometry has established itself as a substantial mathematical theory in its o...
International audienceIn this paper, we generalize the zeta function for a fractal string (as in [18...
Recently, there has been a great interest in understanding the mathematics behind fractal sets such ...
Fractal geometry is usually studied in the context of bounded sets. In this setting,\ud various prop...
Space-filling curves have been colloquially referred to as "fractals" since the term was coined and ...
Soon after B. Mandelbrot’s discovery of the set bearing his name (1), fractal geometry as tool in th...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
In this article I will briefly (but maybe even better) what I learned about Rieman's zeta(s) functio...
Visualization of sets in Euclidean space that possess notions of non-integer dimension has lead to a...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...